Abstract
We construct the set of generic representations for parabolic sub-groups of the complex orthogonal group SO(2n + 1C) and show that the set O p of generic representations of an arbitrary parabolic subgroup P ⊂ S O(2n + 1, C) can be explicitly described in terms of unitary representations of some smaller reductive group G p . More preciselyO p is either homeomorphic to the unitary dual of G p or can be written as a disjoint union , where h >0 and each set is homeomorphic to Ĝ p .
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